2n opening angle

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Experimental data

2n opening angle spectra obtained after the processing of all the runs with thick uranium target are shown below for the tow cases (a) with coordinate cuts implied by the calibration with independent Co-60 source and (b) without the cuts applied and self calibration used:

Cuts explanation.png

Experimental data with coordinate cuts applied

Coordinate cuts were applied but the length of the active area was fixed to 75 cm (the actual length of the active area of the neutron detector)

Total data ana.png

The bin width (x-error) is 7.2 degrees, the total number of bins is 25. Statistical error (y-error) is presented for each bin.

At this stage there is no efficiency normalization involved in the calculation. The main goal is to show that we've got 258 neutrons in all the runs.

Experimental data without coordinate cuts applied I

A. Coordinate cuts were NOT applied.

B. Self calibration was used assuming the length of the active area was fixed to 75 cm (the actual length of the active area of the neutron detector)

Total data ana NOcut.png

Experimental data without coordinate cuts applied II

A. Coordinate cuts were NOT applied. "Whole" region of the neutron hit coordinates was used.

B. Co-60 source calibration was used. The active area length of the neutron detectors was varied according to the neutron hit coordinate distribution and the calibration factor obtained with Co-60 source.

Total data ana NOcut calibr.png

Below the spectra of the neutron detectors effective length is represented after using calibration obtained in a separate experiment with Co-60 source and NO coordinate cuts applied. The actual detector active area lenfth is 75 cm.

Effective length DetE.png

Effective length DetF.png

Effective length DetG.png

Effective length DetH.png

Effective length DetI.png

Effective length DetK.png

Effective length DetM.png

Simulation

GEANT4 was used to sample two neutrons isotropically, to track them and opening angle was observed for two cases when (1) two neutrons hit the same detector (N(same)) and (2) two neutrons hit two different detectors (N(different)). After that the plot of N(different)/(N(same)+N(different)) was made.

The total number of neutron pairs sampled was [math]25 \cdot 10^5[/math], emission of neutrons was in [math]4 \pi[/math] form isotropic point source. Geometry of the experiment was preserved.

The 2n opening angle for the case (1) is shown below:

Multi hit same.png

The 2n opening angle for the case (2) is shown below:

Multi hit different.png

It can be seen that the probability to hit two different detectors about twice larger than the probability to hit the same detector for the isotropic point source of neutrons.

The plot of N(different)/(N(same)+N(different)):

Multihit percentage.png

Hence, (A) in the experimental data we can not see neutron pairs with the opening angle less then ~5 degrees because they all are multi-hit data, (B) multi-hit data disappear at 2n opening angle above 40 degrees.

Correction of experimental data for the geometry

As it was shown above we could not detect multiple hits of the same detector. In order to obtain the influence of the geometry on the data we will consider 2n opening angle for neutrons hitting two different detectors.

Comparison of the data and 2n opening angle obtained via simulation is shown below. The histograms have same number of bins (25) and same bin width (7.2).

Total data simulation.png

The plot on the right was normalized to the total number of neutron pairs sampled during the simulation.

The result of division of experimental data histogram by the normalized simulation data histogram is shown below:

Total data geom corrected.png

Statistics over the last three bins

The number of neutron pairs sampled was increased up to 4E+6. The simulated data (see figure below) have pretty much the same trend as it was presented above for 2.5E+6 sampled neutrons.

Total data geom corrdstat.png

The last three bins were chosen to do statistical analysis. The data are shown below in the table.


Bin center(full width) [deg] Experiment [cnts+/-sqrt(cnts)] Simulation [cnts+/-sqrt(cnts)] Normzd simulation Experiment/(Normlzd simulation)
75.6(7.2) 19.0 +/- 4.4 55.0 +/- 7.4 (1.4 +/- 0.2)E-5 13.82E+5 +/- 27%
82.8(7.2) 9.0 +/- 3.0 40.0 +/- 6.3 (1.0 +/- 0.2)E-5 9.0E+5 +/- 39%
90(7.2) 1.0 +/- 1.0 7.0 +/- 2.6 (0.17 +/- 0.06)E-5 5.8E+5 +/- 100%

As can be seen the last bin in the experimental data has only one count. So it is hard to do a certain conclusion about the precision of the measurement for the last bin. The errors are a bit smaller for the two following bins. It is possible to decrease the number of bins, however, the angular resolution will be decreased either. Currently the bin width is 7.2 degree.

Reduced number of bins

After the number of bins was reduced the experimental data (left) and normalized simulation data (right) look like this:

Exp data binreduced.jpg

Now the bin width is 22.5 degrees.

The plot of the experimental data divided by the normalized simulation data is shown below:


Exp data oversim binreduced.jpg

There is still increase of event number in the 2n opening angle spectrum in the bin# 4. Statistics on the 4th bin is presented below in the table.


Bin center(full width) [deg] Experiment [cnts+/-sqrt(cnts)] Simulation [cnts+/-sqrt(cnts)] Normzd simulation Experiment/(Normlzd simulation)
78.75(22.5) 29.0 +/- 5.4 141.0 +/- 11.9 (35.25 +/- 2.97)E-6 82E+4 +/- 20%

2n angle by Monte Carlo

The photofission lab frame is plotted below. Photon is coming along z-axis. Two fission fragments (heavy and light) created with the corresponding total momentum [math]\vec P_1[/math] and [math]\vec P_2[/math]. Each fission fragment emits one neutron each per fission event.

Geometry 2nfissiom model.png

Momentum of each FF in the lab frame can be described as

[math]P_x = \sqrt{E_{ff}^2-m_{ff}^2}\cdot sin(\theta)cos(\phi)[/math]

[math]P_y = \sqrt{E_{ff}^2-m_{ff}^2}\cdot sin(\theta)sin(\phi)[/math]

[math]P_z = \sqrt{E_{ff}^2-m_{ff}^2}\cdot cos(\theta)[/math]


Mass dependence of fission fragments and their kinetic energy:

Mass vs ebergyff.png


Angular distribution of the FF in the lab frame W(Theta) = a+b*(Sin(Theta))^2. Photon beam is not polarized hence there is no azimuthal anizotropy.


Phi distr ff1.png


Theta distr ff1.png


Light ff Enboost.png


Heavy ff Enboost.png


Angle nhff nlff.png


Angle nhff nlff photonBeam.png


Angle ff neutron.png